Find the area bounded by one arc of the cycloid x = a(0-sin(0)), y = a(1-cos(0)),where a > 0, and 0 <= 0 <= 2pi, and the axis(use Green's theorem).

Khadija Wells

Khadija Wells

Answered question

2021-01-31

Find the region that one of the cycloid's arcs borders x=a(0sin(0)),y=a(1cos(0)),where a > 0, and 002π, and the axis(use Green's theorem).

Answer & Explanation

escumantsu

escumantsu

Skilled2021-02-01Added 98 answers

Step 1
Note that the atea of the region D bounded by C del D is A(D)=12Cxdyydx.
The given cycloid and the x-axis intersect each other at the points (0,0) and (2 a π,0).
Note that, 12Cxdyydx=12y1+xdyydx+12y2+xdyydx.
The parametrization of the segment y1is{x(t)=ty(t)=0over 0t2aπ.
Step 2
The derivative of the above function is computed as follows,
dxdt=1
dydt=0
Now,
12y1+xdyydx=1202aπ(xdydtydxdt)dt
=1202aπ(1(0)(0)(1))dt
=0
Step 3
The parametrization of the segment y1is{x(0)=a(0sin0)y(0)=a(1cos0)over 002π.
The derivative of the above function is computed as follows,
dxd0=a(1cos0)
dyd0=asin0
Now,
12y2+xdyydx=1202π(xdyd0y

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